Monopole scaling dimension using Monte Carlo
arXiv:1808.08970 · doi:10.1103/PhysRevD.98.074513
Abstract
We present a viable Monte Carlo determination of the scaling dimensions $Î_Q$ of flux $Q$ Abelian monopoles through finite-size scaling analysis of the free energy to introduce the background field of classical Dirac monopole-antimonopole pair at critical points of three-dimensional lattice theories. We validate the method in free fermion theory, and by verifying the particle-vortex duality between the monopole scaling dimension at the inverse-XY fixed point and the charge scaling dimension at the XY fixed point. At the $O(2)$ Wilson-Fisher fixed point, we determine the critical exponents $Î_1= 0.13(2)$, $Î_2=0.29(1)$ and $Î_3=0.47(2)$, which we find to be proportional to the finite-size critical spectrum of monopoles on square torus.